Answer :
The answer is A. 42
Solution:
Let x= ones digit, y=tens digit
1st condition (original number) : 7(x+y)=10y + x
2nd condition (new number by reversing the digits): 18+x+y=10x+y
simplifying:
1st condition: 6x=3y
2nd condition: x=2
substituting x=2 to 6x=3y
y=4
Solution:
Let x= ones digit, y=tens digit
1st condition (original number) : 7(x+y)=10y + x
2nd condition (new number by reversing the digits): 18+x+y=10x+y
simplifying:
1st condition: 6x=3y
2nd condition: x=2
substituting x=2 to 6x=3y
y=4
Let x be the first digit (ten's place) of the original number.
Let y be the second digit (one's place) of the original number.
(x + y)7 = original number
(x + y)7 = 10x + y
7x + 7y = 10x + y
6y = 3x
10y + x = (x + y) + 18
9y = 18
y = 2
6y = 3x
6(2) = 3x
12 = 3x
x = 4
x is the first digit, and y is the second digit, so the original number is 42.
Let y be the second digit (one's place) of the original number.
(x + y)7 = original number
(x + y)7 = 10x + y
7x + 7y = 10x + y
6y = 3x
10y + x = (x + y) + 18
9y = 18
y = 2
6y = 3x
6(2) = 3x
12 = 3x
x = 4
x is the first digit, and y is the second digit, so the original number is 42.